Answer:
18.38 × 10⁸.
Explanation:
Absorbance of the cell is directly proportional to their number
A\alpha cells/mL
A=K ×cells/mL ( Here, K is a constant)
so A/ (cells/mL)=K
so A1/( cells/mL)1=A2/ ( cells/mL)2
Here, A1 is initial absorbance, (cells/mL)1= initial concentration, (cells/mL)2= final concentration, A2= final absorption
so ( cells/mL)2=(A2* (cells/mL)1 ) / A1
= (1.25 × 5.75 ×10⁶)/1
= 7.18 ×10⁶.
so final concentration of bacteria in the culture having an absorbance of 1.25 = 7.18 ×10⁶.
so the number of cells after 8 generations
The cell growth is geometrically , after one generation the number of cell doubles, and after a second-generation number of cells becomes 4 times that of initial concentration.
the nth term of geometric progression=arⁿ⁻¹
Here, a is the first term, r =2 ( r=nth term/ (n-1) th term)
here n=9 ( n= number of generations+1)
so 9th term= (7.18 ×10⁶ × 2⁸)
= 18.38 × 10⁸.
so number of cells in 1 mL after 8 generations= 18.38 × 10⁸.
Thus, the answer is 18.38 × 10⁸.
